English

Elementary, Finite and Linear vN-Regular Cellular Automata

Group Theory 2020-11-17 v2 Formal Languages and Automata Theory

Abstract

Let GG be a group and AA a set. A cellular automaton (CA) τ\tau over AGA^G is von Neumann regular (vN-regular) if there exists a CA σ\sigma over AGA^G such that τστ=τ\tau \sigma\tau = \tau, and in such case, σ\sigma is called a generalised inverse of τ\tau. In this paper, we investigate vN-regularity of various kinds of CA. First, we establish that, over any nontrivial configuration space, there always exist CA that are not vN-regular. Then, we obtain a partial classification of elementary vN-regular CA over {0,1}Z\{ 0,1\}^{\mathbb{Z}}; in particular, we show that rules like 128 and 254 are vN-regular (and actually generalised inverses of each other), while others, like the well-known rules 9090 and 110110, are not vN-regular. Next, when AA and GG are both finite, we obtain a full characterisation of vN-regular CA over AGA^G. Finally, we study vN-regular linear CA when A=VA= V is a vector space over a field F\mathbb{F}; we show that every vN-regular linear CA is invertible when V=FV= \mathbb{F} and GG is torsion-free elementary amenable (e.g. when G=Zd, dNG=\mathbb{Z}^d, \ d \in \mathbb{N}), and that every linear CA is vN-regular when VV is finite-dimensional and GG is locally finite with Char(F)o(g)Char(\mathbb{F}) \nmid o(g) for all gGg \in G.

Cite

@article{arxiv.1804.00511,
  title  = {Elementary, Finite and Linear vN-Regular Cellular Automata},
  author = {Alonso Castillo-Ramirez and Maximilien Gadouleau},
  journal= {arXiv preprint arXiv:1804.00511},
  year   = {2020}
}

Comments

16 pages. Extended version of arXiv:1701.02692. arXiv admin note: text overlap with arXiv:1701.02692

R2 v1 2026-06-23T01:11:30.851Z